mundhara 2005
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Report on
MODELING OF CLINKER COOLERS:Applications to Reduction in Energy Consumption
Puneet Mundhara, Surendra Sharma II year Chemical engineering
IIT MADRAS
Under the guidance ofDr. Vivek. V. Ranade
(Scientist , NCL-Pune .)Email: vvranade@ifmg.ncl.res.in
mailto:vvranade@ifmg.ncl.res.inmailto:vvranade@ifmg.ncl.res.in -
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Contents
1. Introduction
2. Simulation model for grate coolers2.1 Subdivision of the cooler into balance segments2.2 Model Equations for cooler
2.2.1 Mass balance for solids2.2.2 Energy balance for solids2.2.3 Mass balance for air2.2.4 Energy balance for air
2.3 Model for calculating convective heat transfer coefficient between clinkers and air
2.4 Balance equations for computational modeling2.4.1 Energy equations for solids2.4.2 Model equations for air
2.5 Solving procedure for model equations2.5.1 Tri-diagonal matrix algorithm2.5.2 Computational model
3. Discussion and results
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Abstract
Grate coolers are extensively used in cement industry to recover heat from hot clinkerscoming out of rotary kilns. Heat transfer in coolers indirectly controls the performance ofthe rotary kiln and is therefore crucial in a cement industry. In this report, we present acomputational model to capture heat transfer in grate coolers. The schematic of gratecooler considered in the present study is shown in Figure 2. The solids of uniform particlesize and constant porosity were assumed to move in a plug flow with constant gratespeed. Air was assumed to enter in a cross flow mode with respect to solids as shown inFigure 1a. To get the temperature profiles of solid bed and air, the length and the heightof clinker bed in the cooler were subdivided into individual balance segments. Theenergy balance was solved for individual segments. Conductive heat transfer wasconsidered for solids in both x and y directions. Convective heat transfer coefficient
between air and solids was calculated from empirical correlation assuming solids as packed bed. The boundary conditions used are shown in Figure 1a. The model equationsobtained from energy balances were solved using TDMA Technique. Several numericalsimulations were carried to understand the influence of operational parameters like gratespeed, solids inlet temperature and particle size, and airflow rate on the performance ofthe cooler. The presented computational model and the simulation results will be helpfulin developing better understanding of heat transfer in grate coolers and to improve thecooler efficiency by choosing optimized operating parameters.
Key words: Grate cooler; Rotary Kiln; Clinker; TDMA technique; Under-relaxation
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1. INTRODUCTION
Grate coolers are widely used in cement industries to recover heat from hot clinkers
coming from the rotary kiln. The schematic of a cement industry is shown in Figure 1.
Figure 1 : Schematic of Cement manufacture
The raw meal is first fed to pre-heaters where the raw meal get heated, recovering heatfrom the hot gases coming from the kiln and calciner. Then it goes to calciner where 60 80 % calcination takes place. And then partly calcined charge is fed slowly to a rotarykiln where calcinations reactions are completed. The outlet temperature of hot clinkersand a part of melt coming out from the rotary kiln is approximately 1673 K. These hotclinkers should be cooled to a temperature around 400 K, by recovering heat from them,which can be used for any other process. In the same time the combustion air required forthe burning process should be preheated to a temperature level such that the fuelconsumption for clinker formation in the rotary kiln is minimum. So to fulfill both the
purposes grate coolers are used in cement industries. Cooling in a grate cooler is achieved by passing a current of air upwards through a layer of clinker bed lying on the air- permeable grate. So the cooler acts as a pre-heater unit for the air used for coalcombustion in rotary kiln and calciner.A typical cement plant producing about 3000 TPD clinkers requires energy input of
about 650-750 kcal/kg clinker (in terms of coal fed to the plant). Considering the volumesinvolved in manufacturing cement, it is worthwhile to explore new ways to reduce energyconsumption per unit weight of product. To make this process efficient the efficiency ofthe cooler plays a key role. Because this recovers heat from the hot clinkers and pre-heat
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the air used for combustion in calciner and rotary kiln. Heat from the clinkers coming outfrom the cooler will not be recovered again and that will be actual loss to the system.Therefore, to decrease the energy consumption in a cement plant it is worthwhile to findthe optimum values of operating parameters for the cooler.
The energy consumption in the cooler is governed by the energy required to drive theclinker bed and the heat losses to the surroundings from the cooler. The clinker bed can be transported using two types of grates: Traveling grate or Reciprocating grate. Intraveling grate coolers a traveling grate transports clinker. On the other hand inreciprocating grate coolers clinker is transported by stepwise pushing of the clinker bed
by the front edge of alternate row plates. For a given mechanism in the cooler the energyrequired for the motion of clinker bed is more or less constant. Therefore, the efficiencyof cooler mainly depends on how effectively the heat is recovered from the clinkers andthe losses from the cooler surface (conduction, convection, radiation) to surroundings.Clinker temperature variation in the cooler has an important influence on the quality ofthe cement produced from the plant. An efficient cooler will be in which outlet
temperature of the clinker is minimum with suitable properties. So to improve theefficiency of the cooler used in cement industries we should choose optimum cooling airrate, clinker input rate, Clinker inlet temperature, cooler length, number of openings forair, and grate speed.
Therefore, a program was undertaken to develop detailed computational models forsimulating the operational parameters for grate coolers. The model presented in thisreport is based on expression for calculating the heat transfer between cement clinker andair particles.In the next section we present a model for grate cooler along with the computationalmethodology. Finally we discuss few results with our conclusions.
2. Simulation model for a grate cooler
2.1 Subdivision of the cooler into balance segments
Using finite volume method the length and the height of the clinker bed in the gratecooler are subdivided into individual balance segments for calculation of heat transfer.The results presented here were calculated for a cooler in which the length wassubdivided in to 120 balance segments and the height into 90 segments as shown inFigure. 2 . The dimensions of a cell were so small such that we can take that each the cellto be uniformed mixed, means that each cell is at a constant temperature equal to the
outlet temperature from that cell.
2.2 Model equation for grate cooler
Model equations for general mass and energy balance in a traveling grate cooler arediscussed below. As shown in figure 1a the solid bed is moving in horizontal directionand the air is moving in cross flow to bed (in perpendicular direction to the grate). The
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grate speed is given by v g. The geometry of the bed has been taken as rectangular. Thelength of the solid bed is L, height H, and the width is W. We have divided the clinkercooler into n segments along the length and m along the height. Now we can write energyand mass balance for air and solid in each subdivision separately.
Figure2. Schematic of clinker cooler
2.2.1 Mass balance for solids
The solids were assumed in a plug flow along x direction. So the mass flow rate of solids
will remain unchanged through out the system and the mass flow rate through each balance segment will be same as the inlet mass flow rate of the solids. Therefore, themass flow rate of solids in each subdivision will be
= H
ymm sin
s ji ),( (1)
2.2.2 Energy balance for solids
A energy balance equation for solids was derived for a general (i ,j) subdivision. Asshown in Fig. 3 the solids are coming at a high temperature taken as T es to this cell. Theyare losing heat by convection and conduction to the cooling air coming from below inthis subdivision and exiting from the cell at a temperature T Ps. The cooler is incontinuous mode and we are assuming it to be stead. So there will be no accumulation ofenergy in any subdivision. Now apply the energy balance on the solids in thissubdivision.
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Figure 3. General (i,j)th cell for solid balance
In this subdivision there will be heat exchange between cement clinkers and air byconvection. There will be conduction from cement clinker subdivision to the all-neighboring cement clinkers subdivision represented by E, W, N, and S. So by applyingthe energy balance on this subdivision:
)(
)1()1(
))1(())1((
ascv
ss
ss
ss p
s y
sss p
s x
s
T T ha y
yT
K
x
xT
K
y
T cu
x
T cu
+
=
+
(2)
In this equation s
is the cement clinker density, C ps
is clinker heat capacity, u xs
is gratespeed, and T s is clinker temperature of solid at any point, K s is clinker thermalconductivity, a is the convection area factor between the clinker and air, h cv isconvective heat transfer coefficient between solid clinker and air, T a is air temperature atany point in the cooler.
In equation 2 the right hand side first and second terms represent the conduction from thecell in x and y directions respectively. Last term in right hand side represents convectiveheat transfer between the air and solids. Left hand side terms shows the net energyremained in the cell coming from x and y direction.As we know that solids dont have any velocity in y direction. So by putting
uy = 0The equation becomes:
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)(
)1(
)1())1((
ascv
ss
ss
ss p
s x
s
T T ha y
y
T K
x
xT
K
x
T cu
+
=
(3)
This is a partial differential equation, which can be converted into an algebraic equation by integrating the equation 3 over the small control volume V of this subdivision. Butwe have assumed that the cell is of unit width and there is no change occurs along thewidth of the cooler. So the volume integral will change to surface integral. Now theequation will be
=
S
ascv
S
ss
S
ss
S
ss p
s x
s
dydxT T hadydx yT
K y
dydx x
T K
xdydx
x
T cu
.)(.)1(
.)1(.))1((
(
(4)
In the integration of equation 3 over the control volume the limits will be:In x direction varies from west cell to the east surface, which are denoted by w to erespectively and in y direction varies from south surface to the north surface, which aredenoted by s and n respectively.
So after integration and by putting limits we get
y xT T ha
x yT
K x yT
K
y xT
K y xT
K
yT cu yT cu
a
p
s
p
cv
s
ss
n
ss
w
ss
e
ss
w
ss p
s x
s
e
ss p
s x
s
+
=
)(
)1()1(
)1()1(
)1()1(
(5)
The subdivisions are very small so we have be assumed that the temperature of the solidsthroughout the subdivision is equal to the outlet temperature of solids from this cell. Nowin this equation by putting the values of T e , T w , T s and T n in the equation
Te = T P (6)
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This is because each cell is at a uniform temperature T p and the outlet temperature fromthat cell is same as T p (Taking that each cell is completely mixed)
Tw = T W (7)
Similarly we can get this because cell output temperature is same as the cell temperatureso T w will be same as the previous cell temperature, which is T W.
As we mentioned that each element is very small so that we can replace Ts by TsBy this we will get x x
( ) ( )( ) (
( ) ()
) y xT T ha
yT T xK yT T xK
xT T yK xT T yK
T ycuT ycu
a p
s p
cv
s
S
s
P
ss
P
s
N
s
sW
sP
ssP
s E
s
sW
s p
s x
ssP
s p
s x
s
+
=
)(
/)()1(/)()1(
/)()1(/)()1(
)()1()()1(
(8)
So now by rearranging the equation in a suitable manner we will get
a s u
s
S
s
S
s
N
s
N
s
W
s
W
s
E
s
E
s
P
s
P S T a T a T a T a T ++++= (9)
This is a standard format to write a steady state equation for diffusion of a property . Inequation 9 the diffusion of Temperature T at any subdivision P is written in terms of heatflux coming form all the directions and a source term.In equation 9 the values of the different constants are
( ) y xhaaaaaa cvPsS s N sW s E sP ++++= (10)a is coefficient of temperature of (i,j) subdivision on which we are writing energy
balance.
sP
E ss
E
This represents the term of heat flux coming from the east direction to this cell. From theeast direction heat transfer is only due to conduction among the solids. In equation 11there is no term of outgoing heat flux due to solid movement because the temperature ofoutgoing solids is equal to the cell temperature.
(11) x yK a = /)1(
( )(W
s p
s x
sssW ycu x yK a += )1(/)1( (12)
Here represents the term of heat flux coming from the west direction to this cell.From the west direction heat flux is due to conduction among the solids and the heat,which is coming with the solids coming to this cell.
sW a
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( )( ) N ss N y xK a = /)1( (13)
This represents the term of heat flux coming from the north direction to this cell. Fromthe north direction heat transfer is only due to conduction among the solids because solidsdont have any motion in this direction.
( )( )S ssS y xK a = /)1( (14)
This represents the term of heat flux coming from the south direction to this cell. Fromthe south direction heat transfer is only due to conduction among the solids becausesolids dont have any motion in this direction.
aP
cvP
sU yT xhaS = (15)
This represents the source of heat in the cell. In this case source term is due to heattransfer by convection. But this will be different at different boundary conditions.
All properties in all these equations should be calculated at the respective celltemperatures. Boundary conditions at the boundaries of the bed are shown in Figure 3. Radiation was considered only at the top layer of clinker bed. At the right face of theclinker bed we assumed that the heat flux in the X direction is zero. At the entrance ofclinker bed we assumed the heat flux in X direction is zero. At the bottom layer of clinker
bed the heat flux was assumed to be zero in y direction. Now by using these boundaryconditions we can form energy balance equations for each subdivision. In these equationsthe unknowns are bed and air temperatures.
2.2.3 Mass balance for air
Cooling air is flowing in direction perpendicular to the grate along the y-axis as shown inFigure 4 .
Figure 4. General (i,j)th subdivision for air balance
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The mass flow rate of air in the bed region is equal to the inlet mass flow rate of air tothe cooler. So the mass balance equation for any subdivision in the bed region will be
==
L x
mmm aina
out jia
in ji ),,(),,( (16)
In the freeboard region we have taken uniform mixing of air coming from horizontaldirection and vertical direction. So the mass balance equation for air in this region will be
aV0
aH1m,i m)i1n(m +=+ (17)
2.2.4 Energy balance for air
We are writing energy balance equations for air in a general (i ,j) subdivision. As shownin Figure 4 the air is coming at a low temperature taken as T sa to this cell. Air isreceiving heat by convection from the solids and exiting from the cell at a temperature
TPa
. The cooler is in continuous mode and we are assuming it to be stead. So there will be no accumulation of energy in any subdivision. A general energy balance for air can bewritten as
)(
)()(
ascv
aa
aa
aa p
a y
aaa p
a x
a
T T ha y
yT
K
x
xT
K
y
T cu
x
T cu
+
+
=
+
(18)
In this equation a is the air density, C pa is air heat capacity, u ya is air inlet speed, and T a is air temperature at any point, K is air thermal conductivity, a is the convection areafactor between the clinker and air, h cv is convective heat transfer coefficient between solidclinkers and air, T s is solid temperature at any point in the cooler. In equation 18 the lefthand side terms represents the net energy input by the air. First two terms in the righthand side are due to conduction between the air layers and the final term is due to theconvection between solids and air. As we know that the thermal conductivity of the air isvery less and the neighboring cells are at approximately same temperature so theconductive heat transfer among the air layers will be negligible. And we have assumedair to be flowing in plug flow along y direction so the air velocity in x direction will bezero.
ux = 0The equation will be
)()(
ascv
aa
p
a
y
a
T T ha y
T cu =
(19)
Similarly by integrating this equation over this control volume V we get( ) ( ) y xT T ha xT cu xT cu a ps pcvsaa pa yanaa pa ya = )( (20)
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Now by putting values of T sa and T na asTna = T Pa Tsa = T Sa
We will get
( ) ( )yx)TT(ha
)xTcuxTcua
ps
pcv
aS
a p
ay
aaP
a p
ay
a
= (21)
So by rearranging the terms in the equation 21 to get the standard format for the diffusionof air temperature
a
u
a
S
a
S
a
N
a
N
a
W
a
W
a
E
a
E
a
P
a
P S T a T a T a T a T a ++++= (22)
In this equation the values of the different constants are
0=a E a (23)This represents that no heat flux is coming to this cell from the east direction. Because airdont have any velocity in this direction and no conduction is present in air.
0=aW a (24)This represents that no heat flux is coming to this cell from the west direction also.Because air dont have any velocity in this direction and no conduction is present in air.
0=a N a (25)This represents that no heat flux have the term of T N. Because we have assumed that theoutlet air temperature is equal to the cell temperature and we are not considering anyconduction in air.
( )S
a p
a y
aaS xcua = (26)
This contains the heat coming to the cell with air from the south direction.
( ) y xhaaaaaa cvPaS a N aW a E aP ++++= )( (27)This is coefficient of air temperature of this cell, which is a function of all othercoefficients and the convection term.
sP
cvP
aU yT xhaS = (28)
This represents the source of heat in the cell. In this case source term is due to heattransfer by convection. But this source term will be different at different boundaryconditions.All the properties should be calculated at respective cell temperatures for calculation ofall these coefficients. Using these general equations we can write energy balanceequations for air in each cell. In these equations the unknowns are bed and airtemperatures.So if we calculate the convective heat transfer coefficient between solids and air, thenthis system of algebraic equations can be solved using any numerical technique forsolving a system of equations.
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2.4 Balance equations for computational modeling
To solve the mass and energy balance equations using a computer model we have to formequations for all the nodes separately. Earlier we have shown the equations of mass andenergy balance for solids and air in a grate cooler. The equations for mass balance are
directly valid for the computer model but for the energy balance the equations have to bemodified suitably. Therefore, to convert the energy equations shown above in section2.2.2 and 2.2.4 for a computer program by taking a (i,j) Cell
Replace the subscriptsP by (i, j )
E by ( i + 1 , j )W by ( i 1 , j )N by ( i , j + 1 )S by ( i , j -1 )
Now by putting appropriate boundary conditions we can write mass and energy balanceequations for all the subdivisions.
2.4.1 Energy equations for solids
Case: 1 i = 2 to (n-1) & j = 2 to (m-1)
This is a general subdivision. In this subdivision conduction from all the sides is present.At this cell we have not considered any radiation from the solids because this solid layerwill be always surrounded with other layers of solids. Therefore, the temperaturedifference between the cell temperature and surrounding temperature will be very less. Sowe the radiation term will be negligible at this layer of solids.
Figure 5. A general computational cell
So for this case the coefficient values in equation 9 will be
( ) y xhaaaaaa cvPsS s N sW s E sP ++++= ( ) E ss E x yK a = /)1( ( )
W
s p
s x
sssW ycu x yK a += )1(/)1(
( )( ) N ss N y xK a = /)1( ( )( )S ssS y xK a = /)1(
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aP
cvP
sU yT xhaS =
Case: 2 i = 1 & j = 1
This is the lower left corner of the grid, formed to solve the energy balance in the grate
cooler. At this cell there will be no conduction from the west side and from south side because there are no solids in these two directions. And at this point the temperature ofsolids coming from the west side is known so T w will not be a variable at this point andthe energy inlet from the west side will behave as a source term in the equation. So forthis case the coefficient values in equation 9 will be
( ) E ss E x yK a = /)1( 0=sW a ( )( ) N ss N y xK a = /)1(
0=sS a ( )
( ) y xha ycuaaa cv
P E
s
p
s
x
ss
N
s
E
s
P +++= )1(
( )in
sin
s p
s x
saP
cvP
sU yT cu yT xhaS += )1(
Case: 3 i = 2 to (n-1) & j = 1
This is the bottom layer of the solids, which is in direct contact with the grate. At this rowof cells there will be no conduction from south side since there are no solids in the southdirection. So for this case the coefficient values in equation 9 will be
( ) E ss E x yK a = /)1( W
s p
s x
sssW ycu x yK a += )1(/)1(
( ) N ss N y xK a = /)1( 0=sS a
( ) y xhaaaaa cvPs N sW s E sP +++= a
PcvP
sU yT xhaS =
Case: 4 i = n & j = 1
This is the lower right corner of the domain. At this cell there will not be any conductionfrom east as well as south direction, since there are no solids present in these directions.So the heat flux from the south direction will be completely zero. So for this case thecoefficient values in equation 9 will be
( E
s p
s x
ss E ycua = )1(
( )( )W
s p
sx
sssW ycu)1(x/yK )1(a +=
( ) N ss N y xK a = /)1( 0=sS a
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( ) y xhaaaa cvPs N sW sP ++= a
PcvP
sU yT xhaS =
Case: 5 i = n & j = 2 to( m-1)
This is the extreme right column of the domain from which directly solids are comingout. At this column of the cells there will be no conduction in east direction. So for thiscase the coefficient values in equation 9 will be
( E
s p
s x
ss E ycua = )1(
( )(W
s p
s x
sssW ycu x yK a += )1(/)1(
( ) N ss N y xK a = /)1( ( )S ssS y xK a = /)1(
) y xhaaaaa cvPsS s N sW sP +++= a
P
cv
P
s
U yT xhaS = Case: 6 i = 1 & j = 2 to (m-1)
This is the extreme left column of the domain from which directly hot clinkers arecoming from the rotary kiln to the cooler. At this column of cells there will not be anyconduction from west direction and the solid inlet temperature is known at this column sothe heat inlet by the solids to these cells will behave as source term. So for this case thecoefficient values in equation 9 will be
( ) E ss E x yK a = /)1( 0=sW a
( ) N ss N y xK a = /)1( ( )S ssS y xK a = /)1(
( ) y xha ycuaaaa cvP E s ps xssS s N s E sP ++++= )1( ( )sins ps xsaPcvPsU yT cu yT xhaS += )1(
Case: 7 i = 1 & j = m
This is the top left corner of the domain from which directly solids are coming in and areexposed to the free board region. At this cell there will not be any conduction from westas well as north direction and the radiation at this cell will be high because solids areexposed to the free board region. Therefore, for this cell we have considered radiationfrom the solids present at this cell. So for this case the coefficient values in equation 9will be
( ) E ss E x yK a = /)1( 0=sW a 0=s N a
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( )S ssS y xK a = /)1( ( ) 3)1()1( sscvP E s ps xssS s E sP T x y xha ycuaaa ++++=
( ) 4)1()1( assins ps xsaPcvPsU T x yT cu yT xhaS ++=
Case: 8 i = 2 to (n-1) & j = m
This is the top row of the domain at which solids are in contact of free board region. Atthis row there will not be any conduction from north direction. But there will be radiationfrom the hot clinkers to air. So for this case the coefficient values in equation 9 will be
( ) E ss E x yK a = /)1( ( )
W
s p
s x
sssW ycu x yK a += )1(/)1(
0=s N a
( )S ssS y xK a = /)1(
( )3
)1( s
s
cv
P
s
S
s
W
s
E
s
P T x y xhaaaaa ++++= 4)1( asa
PcvP
sU T x yT xhaS +=
Case: 9 i = n & j = m
This is the top left corner of the domain from which directly solids are coming out andare exposed to the free board region. At this cell there will not be any conduction fromeast as well as north direction and the radiation at this cell will be high because solids areexposed to the free board region. Therefore, for this cell we have considered radiationfrom the solids present at this cell. So for this case the coefficient values in equation 9will be
0asE =
( )W
s p
s x
sssW ycu x yK a += )1(/)1(
0=s N a
( )S ssS y xK a = /)1( ( )3sscvPsS sW sP xT y xhaaaa +++=
4a
s
a
P
cv
P
s
U xT yT xhaS +=
2.4.2 Model equations for air
Case: 1 i = 1 to n & j = 2 to (m )
This is general cell, which is always surrounded with the other cells from all directions.The coefficient in equation 22 for this case will be
0=a E a
0=aW a
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0a a N = ( )aa pa yaaS xT cua = ( )yxha)aaaa(a cvPaSa NaWaEaP ++++=
( )in
aa p
ay
asP
cvP
aU xTcuyTxhaS +=
All the properties should be calculated at respective cell temperatures for calculation ofall these coefficients.
Case: 2 j = 1 & i = 1 to n
This is bottom layer of the domain at which cooling air is entering into the cooler. Theinlet temperature of the air inlet will be known so at this layer the energy inlet to the cell
by air will behave as a source term for the solving purpose. The coefficient in equation 22for this case will be
0=a E a 0=a
W a
0=a N a 0=aS a ( ) y xhaaaaaa cvPaS a N aW a E aP ++++= )(
( )in
aa p
a y
asP
cvP
aU xT cu yT xhaS +=
All the properties should be calculated at respective cell temperatures for calculation ofall these coefficients.
Case: 3 j = (m+1) & i = 1 to n
In this region only air is present thus this is called free board region. Air coming fromvertical direction and the horizontal direction mixes well and goes to next cell moving asin horizontal direction and some energy comes from the solid top surface radiation also.So energy balance for any (i,m+1)th cell is
[ ] amimiaPaH mia mis misa mimiaPaH miamimiaPaV mi T C mT T xT C mT C m 1,)1,(1,4 )1,(4 ),(1,1)1,1(1,1,),(, )1( ++++++++++ =++ (32)
In this equation is mass flow rate of air coming out vertically from a cell in bed
region, is mass flow rate of air coming horizontally from the previous cell in the
free board region,
aV mim ,
aH mim 1,1 ++
s in the emissivity of solids.
2.5 Solving procedure for model equations
The system of equations formed above was solved using VISUAL FORTRAN code. Inthis system we have (m+1)n unknown air temperatures and (m)(n) unknown solidtemperatures. We have these many numbers of equations also. In this system of equations
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all the terms are linear except the radiation term. So this can be solved usingmultidimensional Newton raphson method directly. But the operation counts for thismethod are very high and this method is generally used for highly non-linear systems.But in our case the non-linearity is only at one boundary so we are not going by thismethod. So to solve the system we are making the radiation term linear. This can be used
when we solve the system iteratively. Now we have a system of linear algebraicequations, which can be solved using direct or indirect (iterative) methods. Some of thedirect methods are Gauss elimination, LU decomposition, and Cramers rule matrixinversion. But operational counts for these methods are very high. As we can see formthe equations that the air temperature of any cell is only dependent on two moretemperatures represents a linear system. Solid temperature of a cell is dependent on 4more temperatures that is similar to two dimensional system. This represents that if wesolve air and solids separately then the air system forms a tri-diagonal system and thesolids form a penta-diagonal system. So this system can be solved by tri-diagonal matrixalgorithm (TDMA).
2.5.1 Tri-diagonal matrix algorithmThis is a technique for rapidly solving tri-diagonal system developed by Thomas (1949),which is also called as Thomas algorithm. Consider a system of equations that has a tri-diagonal form
11111 C D = 2322212 C D =+ 3433323 C D =+
.
nnnnn C D =+ 1
This system of equations can be solved by rearranging terms and then by forward or backsubstitution. We are using backward substitution to solve the system. The general form ofrecurrence relationship for back substitution is
j j j j C A += +1 Where
1=
j j j
j
j A D A
1
1
+
= j j j
j j j
j A D
C C C
So by this procedure we can we can solve any tri-diagonal system very rapidly. This is adirect method for one-dimensional systems and an indirect method for two-dimensional problems. In a two dimensional problem this can be applied iteratively, in a line-by-linefashion. Consider a general two-dimensional discretised equation of form
a
u
a
S
a
S
a
N
a
N
a
W
a
W
a
E
a
E
a
P
a
P S T a T a T a T a T a ++++=
To solve the system we need to have a tri-diagonal system. So the TDMA technique isapplied line by line in the domain. For example to solve along north-south (n-s) lines we
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will assume east and west direction to be known. Therefore the equation can berearranged in this form
a
u
a
W
a
W
a
E
a
E
a
N
a
N
a
P
a
P
a
S
a
S S T a T a T a T a T a ++=+
The right hand side is known because we have already assumed the east and westdirection temperatures. So this is a tri-diagonal system now, which can be solved using
TDMA technique. Subsequently the calculation is moved to the next north-south line.After sweeping whole domain along north-south direction now we can sweep along eastwest direction because the temperature of north-south direction is known. Like this wekeep on sweeping until the values of all the variables converge.
2.5.2 Computational model
Figure 6. (Flow diagram for computer simulation)
The programming code was developed using Visual Fortran. We are solving theequations using iterative procedure. In the code firstly we read operating parameter for
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cooler and the initial guess for the solid and air temperature from the input files. Now atthis guess temperature we calculate air properties and the convective heat transfercoefficient between solids and air. Then we form tri-diagonal system for air along north-south line assuming the solids temperature to be equal to the initial guess. This system ofequations was solved using TDMA technique. Similarly we sweep for whole domain. At
this new air temperature calculate air properties and the convective heat transfercoefficient. Using the air temperature and east-west direction solid temperature as guesssolve for solids first along the north south direction. Sweep along this direction overwhole domain. Now improve the initial guess temperature for further calculations usingunder relaxation technique. So the new guess temperature of solids and air will be
snewT
sold
snew T T T += (33)
where T is the under-relaxation factor. This under relaxation parameter can be varied
from 0 to 1. If we select T equal to zero then it will be same as any normal scheme.
This is used to make the convergence faster and if at T = 0 the system is diverging thenusing this method we can make the system convergent. Now this temperature is used asguess for air calculation and the procedure is repeated until the calculated parameterssatisfy the two norm convergence criteria. Then all the results were printed into separatefiles for air and solids. By changing operating parameters and number of subdivisionsseveral numerical simulations were carried out.
3 Results and discussion
We carried out several simulations by changing operational parameters for the cooler tofind the effect of each parameter on the performance of cooler. Some of the simulationresults are discussed below.
Case: 1
In this case the temperature variation of cement clinker along the length of cooler atvarious heights is discussed and shown in Figure 7. For this case the grate velocity wastaken as 0.1 m/s, mass flow rates of cement clinker and air were taken as 33 kg/s and 25kg/s respectively. The length of cooler was assumed to be 11 m. The air and cementclinker inlet temperatures were taken as 300 K and 1673 K respectively. Iterations werecarried out for these values of operational parameters and the result is shown in Figure 7.
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Figure: 7 Clinker temperature variation against cooler length atvarious heights
As we can see from Figure 7 that at the initial length the heat transfer is more at the bottom layers of clinker bed compare to the upper layers of clinker bed. This is becauseas the air moves upward the temperature of air increases and after a certain bed height itreaches to the solid temperature. After this no more heat transfer can take place. Soaccording to this the temperature of top layer of solids should be maximum.
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Figure: 8 Clinker temperature variation against cooler length at various heightswithout radiation
This can be seen from Figure 8 that when we consider no radiation from solids thetemperature of top layers is always higher than the temperatures of other layers. Butwhen we consider radiation from the solids we can see from the Figure 7 that at the initiallength of cooler top layer temperature slightly less than the middle layer temperature. Theconcept behind this is that in the bed region the radiation will be negligible and thesignificant radiation occurs only at the top layer of clinker because the solids at that layerare in contact with air of free board region. The temperature of air in the free boardregion is much less as compare to clinker temperature. Due to radiation solid temperatureat this layer decreases.
Now as move along the length of cooler we observe that the heat transfer is increasing atthe top layers of clinker and decreasing at the bottom layers of clinker. This is because,after a certain length the bottom layers of solids has reached at a temperature equal to theinlet temperature of air. So no more heat transfer heat transfer can take place at theselayers. Now the air, which goes to top layers, will be at lower temperature so themaximum heat transfer will take place in the upper part of the bed. Because of this therewas a significant difference in outlet temperatures of top and bottom layers of clinker.
Case: 2
In this case temperature variation of air along the length of cooler at various heights is
discussed and shown in Figure 9. The grate velocity was taken as 0.1 m/s. The mass flow
rates of cement clinker and air were taken as 33 kg/s and 25 kg/s respectively. The length
of cooler was assumed to be 11 m and the air and cement clinker inlet temperatures were
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taken as 300 K and 1673 K respectively. Iterations were carried out for these values of
operational parameters and the result is shown in Figure 9.
Figure 9 The temperature variation of air along the length of cooler
As we can see from Figure 9 that at the initial length the heat transfer is more at the
bottom layers of air compare to the upper layers of air. This is because as the air moves
upward the temperature of air increases and after a certain bed height it reaches to the
solid temperature and no more heat transfer can take place. So according to this the
temperature of top layer of air should be maximum. This can be seen from Figure 9 that
in the free board region the temperature of air is less than the temperature of top layer of
air. Because we are considering the mixing of air in free board region and due to mixing
the temperature decreases.
Now as move along the length of cooler we observe that the heat transfer is increasing at
the top layers of air and decreasing at the bottom layers of air. This is because, after a
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As we can see from Figure 10 that at the initial height the heat transfer is more at the
cooler entrance layers of air compare to the cooler exit layers of air. This is because as
the solid moves along the length the temperature of solid decreases and after a certain
length it reaches to very close to the air temperature. Therefore no more heat transfer can
take place at this place.
Now as move along the height of cooler we observe that the heat transfer is increasing at
the cooler exit layers of air and decreasing at the cooler entrance of air. This is because,
after a certain height the temperature of cooler entrance air has reached at a temperature
equal to the inlet temperature of solid. So no more heat transfer heat transfer can take
place at these layers. Now the solid, which goes to cooler exit layers, will be at high
temperature. So the maximum heat transfer will take place in this part of region.
This can be seen from Figure 10 as we move along the height we reach to the free board
region and in this region the temperature of air is less than the temperature of the top
layers of air. The explanation is already given in last Figure 10.
Case: 4As we have seen the temperature variation of cement clinker and air along the length of
cooler at different heights. Here in this case we are going to discuss the clinker and air
temperature variation along the length with mass flow rate of solid . The Figure 11
shows the average caloric temperature variation of clinker and Figure 12 shows thetemperature variation of air in free board region along the length of cooler at different
mass flow rate of clinker. The grate velocity was taken as 0.1 m/s. The mass flow rate of
air was taken as 25 kg/s . The length of cooler was assumed to be 11 m and the air and
cement clinker inlet temperatures were taken as 300 K and 1673 K respectively.
Iterations were carried out for these values of operational parameters and the results are
shown in Figure 11 and Figure 12.
From Figure 11 we can see that as we increase the mass flow rates of solid the
temperature of solids increases. On the other hand in Figure 12 we can see that as we
increases the mass flow rate there is no variation of air temperature with mass flow rate
of solid. This is because of as we increases the solid mass flow rate the heat input
increases but there is no increment in heat transfer between solid and air. Therefore the
air doesnt get any extra amount of heat from solid and therefore the air temperature
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remains constant with mass flow rate of solid. But as the heat input is increasing the solid
temperature also increases.
Figure. 11 variation of clinker temperature along the length of cooler atdifferent mass flow rate of solid
Figure. 12 Variation of air temperature in free board region along the length of cooler atdifferent mass flow rate of solid
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From these graphs we reach to a conclusion that as we increases the mass flow rate the
air temperature doesnt increases and solid temperature increases. But the main task of
cooler is to cool the cement clinker to the lowest possible temperature and in the same
time the air should be preheated to a temperature level such that we need the lowest fuelof energy for the burning process in rotary kiln. Therefore we have to find out an
optimum value of mass flow rate of solid so that the recovery of energy is maximum in
the cooler and the plant output is also reasonable. Because as we decrease clinker mass
flow rate the output from the plant will decrease.
Case: 5
As we have seen the average caloric temperature variation of cement clinker and air infree board region along the length of cooler with mass flow rate of solid. Now we aregoing to discuss the variation of average caloric temperature of clinker and air temperature in free board region along the length of cooler at different mass flowrates of air .
Figure. 13 Variation of average caloric temperature of the clinker along thelength of cooler at different mass flow rate of air
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mass flow rate of air for which energy recovery is maximum and the mass flow rate of airand its temperature is suitable for coal burning in rotary kiln and calciner.Case: 6
As we have seen the average caloric temperature variation of cement clinker and airtemperature variation in free board region along the length of cooler with mass flow rateof solid and air. Now we are going to discuss the variation of average caloric temperatureof clinker and air temperature variation in free board region with grate speed .
Figure . 15 Variation of air temperature in free board region along the length ofcooler at different grate speeds
The Figure 15 shows the temperature variation of air in free board region along the lengthof cooler at different grate speeds. The mass flow rate of solid was taken as 33 kg/s . Thelength of cooler was assumed to be 11 m and the air and cement clinker inlet
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temperatures were taken as 300 K and 1673 K respectively. Iterations were carried out atthese values of operational parameters and the result is shown in Figure 15.
From the figure we can see that as we increase grate speed first the air outlet temperatureincreases with grate speed and after a value of grate speed (~ 0.13m/s) it starts
decreasing. The region behind this is that as we increase grate speed the residence time ofsolids will decrease because of this the heat transfer will decrease. On the other hand asgrate speed increases the solid bed height will decrease so the rate of heat transfer willincrease. So because of these two effects at a certain velocity the heat transfer will bemaximum. For this case the optimum grate speed is around 0.13 m/sec.
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References:
Martin, H. :Low Peclet Number Particle to fluid heat and mass transfer in packed beds.Chemical Engineering Science 33 (1978),pp. 913-919.
R. Byron Bird, Warren E. Stewart, Edwin N. Lightfoot, Heat transfer coefficients forforced convection through packed beds, Transport Phenomena, Second edition.
B. W. Gamson, G. Thodos, and O. A. Hougen, Trans. AICHE, 39 , 1-35(1943).
G. Locher: Mathematical models for the cement clinker burning process-part 4, ZKGINTERNATIONAL- No. 6/2002 (Volume 55)
H. K. Versteeg and W. Malalasekera:An introduction to computational fluid dynamics-The finite volume method
Phani K. Adapa, Greg J. Schoenau and Shahab Sokhansanj: Performance study of a heat pump dryer system for specialty crops-part 1: Development of a simulation model.
EUROPEAN COMMISSION: Reference document on best available techniques in thecement and lime manufacturing industries. (December 2001)
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NOMENCLATURE USED IN THE REPORT
s = Density of cement clinker (solid) (kg/m 3)s
xu = Velocity of cement clinker in x-direction (m/s)s
pc = Specific heat capacity of cement clinker (kJ/kgK)
= Porosity of clinker bedsK = Thermal conductivity of cement clinker (W/mK)
cvh = Conductive heat transfer coefficient between air and cementclinker (W/m 2K)
a = Convection area factor between air and cement clinkersT = Temperature of cement clinker in any subdivision (K)aT = Temperature of air in any subdivision (K)s
PT = Temperature of cement clinker in the (i, j ) subdivision (K)
sW T = Temperature of cement clinker which is coming out from west
subdivision of the (i, j) cell (K)s
N T = Temperature of cement clinker which is going out from northsubdivision of the (i, j) cell (K)
sS T = Temperature of cement clinker which is coming out from south
subdivision of the (i, j) cell (K) x = Length of subdivision (m) y = Height of subdivision (m)
a = Density of air (kg/m 3)a
xu = Velocity of air in X-direction (m/s)a
pc = Specific heat air (kJ/kgK)a
yu = Velocity of air in y direction (m/s)aK = Thermal conductivity of air (W/mK)
aPT = Temperature of air in the (i, j) subdivision (K)a
S T = Temperature of air which is coming out from south subdivision of(i , j) subdivision (K)
Re = Reynolds numbers
yu = Velocity of cement clinker in y direction (m/s)s
U S = Source term of cement clinkers
inT = Inlet temperature of cement clinker (K)aV m0 = Inlet mass flow rate of air in vertical direction (kg)aH
mim 1, + = Mass flow rate of air in horizontal direction in (i, m+1) subdivision
= Stefan-Boltzmann constant (W/m 2 K 4)
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aV mim , = Mass flow rate of air in horizontal direction in (i ,m) subdivision
n = Number of subdivision in x directionm = Number of subdivision in y direction
s = Emissivity of cement clinkersa
Pa = Temperature coefficient of air in (i, j) subdivision
a E a = Temperature coefficient of air which is going out from east
subdivision of (i , j) subdivisionaW a = Temperature coefficient of air which is coming out from west
subdivision of (i , j) subdivisiona
N a = Temperature coefficient of air which is going out from northsubdivision of (i , j) subdivision
aS a = Temperature coefficient of air which is coming out from east
subdivision of (i , j) subdivisionsPa = Temperature coefficient of cement clinker in (i, j) subdivisions
E a = Temperature coefficient of cement clinker which is going out fromeast subdivision of (i , j) subdivision
sW a = Temperature coefficient of cement clinker which is coming out from
west subdivision of (i , j) subdivisions
N a = Temperature coefficient of cement clinker which is going out fromnorth subdivision of (i , j) subdivision
sS a = Temperature coefficient of cement clinker which is coming out from
south subdivision of (i , j) subdivisiona
inT = Inlet temperature of air
JH = Chilton-Colburn factort = Under-relaxation factor of temperaturea = Viscosity of air
s = Spehericity of cement clinker.a
U S = Source term of air
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NOMENCLATURE OF COMPUTER MODEL FOR CLINKERCOOLER
AE Coefficient of temperature of east side cell
A_FACTOR Convective area factor between air and clinker particles
ALPHA Under relaxation coefficient
AN Coefficient of temperature of north side cell
AS Coefficient of temperature of south side cell
ATOLD Temperature of air found in previous iteration
ATSOLD Temperature of solid found in previous iteration
AW Coefficient of temperature of west side cell
CP_A Specific heat capacity of airCP_S Specific heat capacity of cement clinker
DEN_A Density of cooling air
DEN_ACTUAL Density variation of air with respect to temperature
DEN_S Density of cement clinker
DIFF_A Diffusitivity of air
DP_S Diameter of cement clinker particle
EMISS Emissivity of clinker particles
HB Height of bed in clinker cooler
H_CONV Convective heat transfer coefficient between air and
clinker
JO Chilton-Colburn factor
KA Thermal conductivity of air
KINVIS_A Kinematic viscosity of air
KS Thermal conductivity of cement clinker
LEN_G Length of clinker cooler
M Number of subdivision in Y direction (along the bed
height)
MA_IN Inlet mass flow rate of air in clinker cooler
MAFLUX Mass flux rate of air
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